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عنوان
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A pseudo−operational collocation method for optimal control problems of fractal−fractional nonlinear Ginzburg−Landau equation
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نوع پژوهش
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مقاله چاپشده
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کلیدواژهها
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Fractal−fractional (FF) derivative; Shifted Jacobi polynomials (SJPs); Operational matrices; Nonlinear Ginzburg−Landau equation; Optimal control problem.
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چکیده
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The presented work introduces a new class of nonlinear optimal control problems in two dimensions whose constraints are nonlinear Ginzburg−Landau equations with fractal−fractional (FF) derivatives. To acquire their approximate solutions, a computational strategy is expressed using the FF derivative in the Atangana−Riemann−Liouville (A-R-L) concept with the Mittage-Leffler kernel. The mentioned scheme utilizes the shifted Jacobi polynomials (SJPs) and their operational matrices of fractional and FF derivatives. A method based on the derivative operational matrices of SJR and collocation scheme is suggested and employed to reduce the problem into solving a system of algebraic equations. We approximate state and control functions of the variables derived from SJPs with unknown coefficients into the objective function, the dynamic system, and the initial and Dirichlet boundary conditions. The effectiveness and efficiency of the suggested approach are investigated through the different types of test problems.
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پژوهشگران
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پریسا رحیم خانی (نفر سوم)، طاهره شجاعی زاده (نفر اول)، عفت گلپر-رابوکی (نفر دوم)
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